Understanding the Relationship Between Triangle and Square Areas

How to calculate the perimeter of a square.

How to determine the circumference of a circle.

How the area of a triangle relates to the area of a square when their dimensions are related.

How to find the volume of a cube.

Side times side

One-half base times height

Length times width

Base times height

Base times height

Side times side

One-half base times height

Length times width

The triangle's area is twice the square's area.

The triangle's area is equal to the square's area.

The triangle's area is half the square's area.

The triangle's area is one-fourth the square's area.

50 square inches

100 square inches

150 square inches

200 square inches

25 square inches

100 square inches

50 square inches

75 square inches

The triangle's area is half the square's area.

The triangle's area is one-fourth the square's area.

The triangle's area is equal to the square's area.

The triangle's area is twice the square's area.

The triangle's area is half the square's area when the base and height are equal to the side of the square.

The triangle's area is always larger than the square's area.

The triangle's area is always smaller than the square's area.

The triangle's area is unrelated to the square's area.

To prove that the square's area is always smaller.

To demonstrate the relationship between the areas with concrete numbers.

To show that the triangle's area is always larger.

To illustrate that the triangle's area is unrelated to the square's area.